Abstract
This chapter discusses closure relations for orbits on affine symmetric spaces under the action of minimal parabolic subgroups. It presents an assumption where G is a connected Lie group, σ an involutive automorphism of G, and η a subgroup of G such that ▪ where Gσ= {x ∈G│ σ x = x} and ▪ is the connected component of Gσ containing the identity. The factor space H/G is called an affine symmetric space. G is assumed as a real semisimple throughout this chapter.
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